Multi-linear forms, structure of graphs and Lebesgue spaces

Abstract

Consider the operator TKf(x)=∫ Rd K(x,y) f(y) dy, where K is a locally integrable function or a measure. The purpose of this paper is to study the multi-linear form KG(f1, …, fn)=∫ … ∫ Π \(i,j): 1 ≤ i<j ≤ n; E(i,j)=1 \ K(xi,xj) Πi=1n fi(xi) dxi, where G is a connected graph on n vertices, E is the edge map on G, i.e E(i,j)=1 if and only if the i'th and j'th vertices are connected by an edge, K is the aforementioned kernel, and fi: Rd R, measurable. This paper establishes multi-linear inequalities of the form KG(f1,f2, …,fn) ≤ C ||f1||Lp1( Rd) ||f2||Lp2( Rd) … ||fn||Lpn( Rd) and determines how the exponents depend on the structure of the kernel K and the graph G.